This question is incomplete
Complete Question
If the measurement of a central angle is 5pi/6, find the length of its intercepted arc in a circle with a radius of 15 inches
a 33.4 inches
b. 35.6 inches
C. 37.5 inches
d. 39.3 inches
Answer:
d. 39.3 inches
Step-by-step explanation:
We are to find the Arc length of the circle
To solve the above question, the formula is given as:
Arc length = Central angle × radius
From the above Question, we are given:
Central angle = 5pi/6 = 5π/6
Radius = 15 inches
Hence,
Arc length = 5π/6 × 15 inches
Arc length = 235.61944901923448/ 6
Arc length = 39.26990817 inches
Approximately , the Arc length
= 39.3 inches.
Therefore, Option d is the correct answer.
P=98 m
l +9=4w
p=2l+2w
98=2(4w-9) +2w
98 = 8w-18+2w
116=10w
w=11,6 m
l = 4w-9 = 4*11,6 -9 = 46,4 -9 = 37,4 m
w=11,6 m
l= 37,4 m
Good luck without a picture
Answer:
c = 7
d = 5
Step-by-step explanation:
Notice that in the first expression, x^c is inside a square root, and only perfect squares can be extracted from it. On the simplified form shown on the right hand side, we have x^3 outside the root and a single "x" left inside. In order for such to happen (x^3 get outside the root) there must have been an x^6 inside the square root. This together with the sole "x" that was left in the root, totals seven factors of x that should have been originally inside the square root:
x^6 * x = x^7 therefore c was a "7"
In the second expression we have a CUBIC root, so only perfect cubes can get extracted from it. Since there is one factor "x" shown in the simplified form (right hand side of the equal sign), that means that it must have been an x^3 (perfect cube) apart from the x^2 that was left inside the root. This makes the original power of x to be a 3 + 2 = 5.
Therefore d = 5
Step-by-step explanation:
Given expression is:
We will solve each statement one by one to see which statements are correct.
<u>If y=3/4, the values of 16y^2 is 12</u>
Putting y = 3/4 in expression
<u>If y=1/4, the values of 16y^2 is 2</u>
Putting y = 1/4 in expression
<u></u>
<u></u>
<u></u>
<u>If y=3/8, the values of 16y^2 is 4/9</u>
Putting y = 3/8 in expression
<u></u>
<u></u>
<u></u>
<u>If y=1/8, the values of 16y^2 is 1/4</u>
Putting y = 1/8 in expression
<u></u>
<u></u>
<u></u>
<u></u>
<u>If y=2/3, the values of 16y^2 is 3/4</u>
Putting y = 2/3 in expression
<u></u>
<u></u>
<u></u>
<u>Hence,</u>
The correct statement is:
If y=1/8, the values of 16y^2 is 1/4
Keywords: Expressions, variables
Learn more about expressions at:
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